Abstract
ABSTRACT A notion of strongly prime is introduced for Γ-rings, and the class of strongly prime Γ-rings is shown to be special. Let M be a Γ-ring with left and right operator rings L and R, respectively. It is shown that s(L)+ = so (M), and if M has both unities, then s(R)* = so(M). where s() and so() denote the strongly prime radical of a ring and a Γ-ring respectively. If m and n are positive integers, then so (Mmn) = so (M)mn, where Mmn denotes the set of ▪ x n matrices over M. considered as a Γamn -ring. The relationship of so(M) with the other radicals of M is discussed.
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